On closed subspaces with Schauder bases in non-archimedean Frechet spaces
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Date
2001-12
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Royal Netherlands Academy of Arts and Sciences
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Abstract
The main purpose of this paper is to prove that a non-archimedean Frechet space of countable type
is normable (respectively nuclear; reflexive; a Monte1 space) if and only if any its closed subspace
with a Schauder basis is normable (respectively nuclear; reflexive; a Monte1 space). It is also shown
that any Schauder basis in a non-normable non-archimedean Frechet space has a block basic sequence
whose closed linear span is nuclear. It follows that any non-normable non-archimedean
Frechet space contains an infinite-dimensional nuclear closed subspace with a Schauder basis.
Moreover, it is proved that a non-archimedean Frechet space E with a Schauder basis contains an
infinite-dimensional complemented nuclear closed subspace with a Schauder basis if and only if any
Schauder basis in E has a subsequence whose closed linear span is nuclear.
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Indag. Mathem., (N.S.), 12(4),519-531.